y=sin^(-1){(2^(x+1)*3^(x))/(1+(36)^(x))}...

y=sin^(-1){(2^(x+1)*3^(x))/(1+(36)^(x))}

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y=sin^(-1)[(2^(x+1)xx3^(x))/(1+(36)^(x))], find (dy)/(dx)

Differentiate sin^(-1){(2^(x+1).3^(x))/(1+(36)^(x))} with respect to x.

Find the derivative of sin^(-1) [(2^(x+1).3^(x))/(1+ (36)^(x))] with respect to x.

Differentiate the following with respect to x:sin^(-1)((2^(x+1)*3^(x))/(1+(36)^(x)))

Differentiate w.r.t. x, sin^(-1)[(2^(x+1)*3^(x))/(1+(36)^(x))] .

Differentiate the following with respect to x : sin^(-1)((2^(x+1). 3^x)/(1+(36)^x))

Differentiate the following with respect to x : sin^(-1)((2^(x+1). 3^x)/(1+(36)^x))

Differentiate the following with respect to x: sin^(-1)((2^(x+1)3^x)/(1+36^x))

Differentiate the following with respect to x: sin^-1[(2^(x+1).3^x)/(1+(36)^x)]

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